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Gleason's theorem has a constructive proof
Journal of Philosophical Logic 29 (4):425-431 (2000)
Abstract
Gleason's theorem for ������³ says that if f is a nonnegative function on the unit sphere with the property that f(x) + f(y) + f(z) is a fixed constant for each triple x, y, z of mutually orthogonal unit vectors, then f is a quadratic form. We examine the issues raised by discussions in this journal regarding the possibility of a constructive proof of Gleason's theorem in light of the recent publication of such a proofMy notes
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Citations of this work
On Naturalizing the Epistemology of Mathematics.Jeffrey W. Roland - 2009 - Pacific Philosophical Quarterly 90 (1):63-97.
Bishop's Mathematics: a Philosophical Perspective.Laura Crosilla - forthcoming - In Handbook of Bishop's Mathematics. CUP.
Fermat’s last theorem proved in Hilbert arithmetic. III. The quantum-information unification of Fermat’s last theorem and Gleason’s theorem.Vasil Penchev - 2022 - Logic and Philosophy of Mathematics eJournal (Elsevier: SSRN) 14 (12):1-30.
A constructivist perspective on physics.Peter Fletcher - 2002 - Philosophia Mathematica 10 (1):26-42.
References found in this work
Gleason's theorem is not constructively provable.Geoffrey Hellman - 1993 - Journal of Philosophical Logic 22 (2):193 - 203.
Constructive mathematics and unbounded operators — a reply to Hellman.Douglas S. Bridges - 1995 - Journal of Philosophical Logic 24 (5):549 - 561.
A constructive formulation of Gleason's theorem.Helen Billinge - 1997 - Journal of Philosophical Logic 26 (6):661-670.
Diagonalization of continuous matrices as a representation of intuitionistic reals.Andre Scedrov - 1986 - Annals of Pure and Applied Logic 30 (2):201-206.
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